Question:

In a triangle ABC if $\cos \, A + \cos \, B + \cos \, C = \frac{3}{2}$ , then the triangle is

Updated On: Jul 14, 2022

Right angled
Right angled isoceles
Equilateral
None of these

Hide Solution

Verified By Collegedunia

The Correct Option is C

Solution and Explanation

We have, in $\Delta ABC$ $\cos\,A +\cos\,B + \cos\,C= \frac{3}{2}$ We know in $\Delta ABC$, $cos\, A + \cos\, B +\cos\,C \le \frac{3}{2}$ Since, $\cos\, A + \cos\, B +\cos\,C=\frac{3}{2}$ $\therefore A= B = C= 60^{\circ}$ Hence, $\Delta ABC$ is an equilateral triangle.

Was this answer helpful?

Questions Asked in UPSEE exam

Acetic acid dissociates 1.3%. What will be the pH of $\frac {N}{10}$ solution of the acid.
- UPSEE - 2019
- Acids and Bases
View Solution
Let z = x + iy be a complex number satisfying the following equation |z - (2 + i)| = |Re(z) - 4 | Which of the following options describes the above equation?
- UPSEE - 2019
- Complex Numbers and Quadratic Equations
View Solution
Let x be an $n \times 1$ matrix. Let O and I be the zero, and identity matrices of order n, respectively. Define $P = - \frac{xx^T}{x^Tx}$ is the transpose of x. Then which of the following options is always CORRECT?
- UPSEE - 2019
- Transpose of a Matrix
View Solution
Let z = x + iy be a complex number. The equation arg $\left( \frac{z + 1}{z}\right) = \frac{\pi}{4}$ represents
- UPSEE - 2019
- Complex Numbers and Quadratic Equations
View Solution
Let $a_1, a_2, a_3$, ... be an arithmetic progression with nonzero common difference. It is given that $\sum^{12}_{i = 4} a_i = 63$ and $a_k = 7 $ for some k . Then the value of k is
- UPSEE - 2019
- Arithmetic Progression
View Solution

View More Questions

Concepts Used:

Properties of Inverse Trigonometric Functions

The elementary properties of inverse trigonometric functions will help to solve problems. Here are a few important properties related to inverse trigonometric functions:

Property Set 1:

Sin⁻¹(x) = cosec⁻¹(1/x), x∈ [−1,1]−{0}
Cos⁻¹(x) = sec⁻¹(1/x), x ∈ [−1,1]−{0}
Tan⁻¹(x) = cot⁻¹(1/x), if x > 0 (or) cot⁻¹(1/x) −π, if x < 0
Cot⁻¹(x) = tan⁻¹(1/x), if x > 0 (or) tan⁻¹(1/x) + π, if x < 0

Property Set 2:

Sin⁻¹(−x) = −Sin⁻¹(x)
Tan⁻¹(−x) = −Tan⁻¹(x)
Cos⁻¹(−x) = π − Cos⁻¹(x)
Cosec⁻¹(−x) = − Cosec⁻¹(x)
Sec⁻¹(−x) = π − Sec⁻¹(x)
Cot⁻¹(−x) = π − Cot⁻¹(x)

Property Set 3:

Sin⁻¹(1/x) = cosec⁻¹x, x≥1 or x≤−1
Cos⁻¹(1/x) = sec⁻¹x, x≥1 or x≤−1
Tan⁻¹(1/x) = −π + cot⁻¹(x)

Property Set 4:

Sin⁻¹(cos θ) = π/2 − θ, if θ∈[0,π]
Cos⁻¹(sin θ) = π/2 − θ, if θ∈[−π/2, π/2]
Tan⁻¹(cot θ) = π/2 − θ, θ∈[0,π]
Cot⁻¹(tan θ) = π/2 − θ, θ∈[−π/2, π/2]
Sec⁻¹(cosec θ) = π/2 − θ, θ∈[−π/2, 0]∪[0, π/2]
Cosec⁻¹(sec θ) = π/2 − θ, θ∈[0,π]−{π/2}
Sin⁻¹(x) = cos⁻¹[√(1−x2)], 0≤x≤1 = −cos⁻¹[√(1−x2)], −1≤x<0

Property Set 5:

Sin⁻¹x + Cos⁻¹x = π/2
Tan⁻¹x + Cot⁻¹(x) = π/2
Sec⁻¹x + Cosec⁻¹x = π/2

Property Set 6:

If x, y > 0

Tan⁻¹x + Tan⁻¹y = π + tan⁻¹ (x+y/ 1-xy), if xy > 1

Tan⁻¹x + Tan⁻¹y = tan⁻¹ (x+y/ 1-xy), if xy < 1

If x, y < 0

Tan⁻¹x + Tan⁻¹y = tan⁻¹ (x+y/ 1-xy), if xy < 1

Tan⁻¹x + Tan⁻¹y = -π + tan⁻¹ (x+y/ 1-xy), if xy > 1

Property Set 7:

sin⁻¹(x) + sin⁻¹(y) = sin⁻¹[x√(1−y2)+ y√(1−x2)]
cos⁻¹x + cos⁻¹y = cos⁻¹[xy−√(1−x2)√(1−y2)]

Property Set 8:

sin⁻¹(sin x) = −π−π, if x∈[−3π/2, −π/2]

= x, if x∈[−π/2, π/2]

= π−x, if x∈[π/2, 3π/2]

=−2π+x, if x∈[3π/2, 5π/2] And so on.

cos⁻¹(cos x) = 2π+x, if x∈[−2π,−π]

= −x, ∈[−π,0]

= x, ∈[0,π]

= 2π−x, ∈[π,2π]

=−2π+x, ∈[2π,3π]

tan⁻¹(tan x) = π+x, x∈(−3π/2, −π/2)

= x, (−π/2, π/2)

= x−π, (π/2, 3π/2)

= x−2π, (3π/2, 5π/2)

Property Set 9: